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Let me preface this with the statement that it is in fact difficult, and difficult for a reason. Adding fractions is NOT like adding integers. So expect to read this a few times, understanding a little bit more each time.
Start with an understanding of the relationship between fractions and division. 1 [divided by] 2 is not commutative; that is, 1 [divided by] 2 is NOT equal to 2 [divided by] 1. However, we can use the multiplicative inverse (the inverse relationship between multiplication and division) to turn division into multiplication:
1 [divided by] 2 = 1 x 1/2.
Now 1 x 1/2 is commutative, that is:
1 x 1/2 = 1/2 x 1.
Similarly, division is not associative, but multiplication of fractions is. This establishes an understanding of fractions as the multiplicative inverse form of division - a form of division that follows the rules (commutative, associative, distributive) of multiplication.
Note that when we multiply fractions, we are multiplying with multiplicative inverses, and can commute and associate to multiply numerators and multiply denominators:
2/3 x 3/4 = (2x3)/(3x4) (this step can be expanded if it aids understanding)
Next, when adding fractions, we have a multiplicative inverse embedded in the first fraction, followed by an explicit addition, followed by another multiplicative inverse embedded in the second fraction. What this means is that we effectively have mixed operations of both multiplication (in inverse form embedded in the fractions) and addition. We therefore MUST use a strategy related to the distributive property (which includes reverse distribution, known as factoring). The denominator (multiplicative inverse) is what needs to be factored, but it must be common to be factored so we have to take care of that first.
So how do we get a common denominator? To do this we need to also understand the multiplicative identity - the ONLY thing we can multiply something by without changing it's value (i.e. being wrong) is 1. But we can write 1 as a fraction with the same number in the numerator and denominator, such as 1 = 7/7. Now, adding fractions may look like this:
2/3 + 3/4 = 1x(2/3) + (3/4)x1 (multiply both sides by 1)
= (4/4)x(2/3) + (3/4)x(3/3) (write 1 as 4/4 on the left and 3/3 on the right)
At this point, either side of the '+' contains a multiplication of fractions, which we can multiply across numerators and multiply across denominators (as above), as long as we don't involve the '+' yet:
= (4x2)/(4x3) + (3x3)/(4x3)
=8/12 + 9/12
NOW we can factor the common denominator:
=(8 + 9)/12
=17/12
Unfortunately the font of the text interface is not conducive to math.
What else can I help you with?
Who uses the least common multiple?
Anyone who is trying to add or subtract fractions.
What is operation with algebraic fractions?
U can add divide subtract and multiply is that what u meant cuz I really don't understand what ur trying o ask
Are algebraic fractions whose numerator and denominator are polynomials?
Yes.
How do you add and subtract fractions with the same denominator?
it stay the same when you subtract fractions and when you add fractions.
What are algebraic fractions whose numerator and denominator are polynomials?
A rational fraction.
Why does integration by partial fractions work?
It is because the partial fractions are simply another way of expressing the same algebraic fraction.
How do you add two fractions that have like denominators?
In fractions, you can NEVER add or subtract
What is always needed to add fractions?
Fractions! Otherwise you don't have anything to add.
How do I add improper fractions?
Change them into mixed numbers and add the integers and fractions together ensuring that the fractions have a common denominator.
When you add fractions do you add the denominator to?
No.
How do you simplify an algebraic expression that has fractions?
Multiply every term in the expression by the least common multiple of all the denominators. That will get rid of all fractions.
When you add fractions do you flip improper fractions around?
no
